Scalable handling of real arithmetic is a crucial part of the verification of hybrid systems, mathematical algorithms, and mixed analog/ digital circuits. Despite substantial advances in verification technology, complexity issues with classical decision procedures are still a major obstacle for formal verification of real-world applications, e.g., in automotive and avionic industries. To identify strengths and weaknesses, we examine state of the art symbolic techniques and implementations for the universal fragment of real-closed fields: approaches based on Quantifier elimination, Gröbner Bases, and semidefinite programming for the Positivstellensatz. Within a uniform context of the verification tool KeYmaera, we compare these approaches qu...
Writing accurate numerical software is hard because of many sources of unavoidable uncertainties, in...
Symbolic Computation and Satisfiability Checking are viewed as individual research areas, but they s...
International audienceThe satisfiability problem in real closed fields is decidable. In the context ...
Abstract. We present a fully proof-producing implementation of a quantifier elimination procedure fo...
Abstract. We give a survey of three implemented real quantifier elimi-nation methods: partial cylind...
This paper describes a formalization of discrete real closed fields in theCoq proof assistant. This ...
International audienceEffective quantifier elimination procedures for first-order theories provide a...
We present the application of real quantifier elimination to formal verification and synthesis of co...
Efficient decision procedures for arithmetic play a very important role in formal verification. In ...
This dissertation investigates the problems of two distinctive formal verification techniques for ve...
textThe goal of formal verification is to use mathematical methods to prove that a computing system...
AbstractWe propose a decision procedure for algebraically closed fields based on a quantifier elimin...
Recent advances in program verification indicate that various verification problems can be reduced t...
Abstract. First-order logic provides a convenient formalism for describ-ing a wide variety of verifi...
Real algebraic geometry deals with the solution set of (possibly quantified) systems of polynomial e...
Writing accurate numerical software is hard because of many sources of unavoidable uncertainties, in...
Symbolic Computation and Satisfiability Checking are viewed as individual research areas, but they s...
International audienceThe satisfiability problem in real closed fields is decidable. In the context ...
Abstract. We present a fully proof-producing implementation of a quantifier elimination procedure fo...
Abstract. We give a survey of three implemented real quantifier elimi-nation methods: partial cylind...
This paper describes a formalization of discrete real closed fields in theCoq proof assistant. This ...
International audienceEffective quantifier elimination procedures for first-order theories provide a...
We present the application of real quantifier elimination to formal verification and synthesis of co...
Efficient decision procedures for arithmetic play a very important role in formal verification. In ...
This dissertation investigates the problems of two distinctive formal verification techniques for ve...
textThe goal of formal verification is to use mathematical methods to prove that a computing system...
AbstractWe propose a decision procedure for algebraically closed fields based on a quantifier elimin...
Recent advances in program verification indicate that various verification problems can be reduced t...
Abstract. First-order logic provides a convenient formalism for describ-ing a wide variety of verifi...
Real algebraic geometry deals with the solution set of (possibly quantified) systems of polynomial e...
Writing accurate numerical software is hard because of many sources of unavoidable uncertainties, in...
Symbolic Computation and Satisfiability Checking are viewed as individual research areas, but they s...
International audienceThe satisfiability problem in real closed fields is decidable. In the context ...